Brauer–Thrall for Totally Reflexive Modules over Local Rings of Higher Dimension

Algebras and Representation Theory - Tập 17 - Trang 997-1008 - 2013
Olgur Celikbas1, Mohsen Gheibi2,3, Ryo Takahashi4,5
1Department of Mathematics, University of Missouri, Columbia, USA
2Faculty of Mathematical Sciences and Computer, Tarbiat Moallem University, Tehran, Iran
3School of Mathematics, Institute for Research in Fundamental Sciences (IPM), Tehran, Iran
4Graduate School of Mathematics, Nagoya University, Chikusaku, Japan
5Department of Mathematics, University of Nebraska, Lincoln, USA

Tóm tắt

Let R be a commutative Noetherian local ring. Assume that R has a pair {x,y} of exact zerodivisors such that dim R/(x,y) ≥ 2 and all totally reflexive R/(x)-modules are free. We show that the first and second Brauer–Thrall type theorems hold for the category of totally reflexive R-modules. More precisely, we prove that, for infinitely many integers n, there exists an indecomposable totally reflexive R-module of multiplicity n. Moreover, if the residue field of R is infinite, we prove that there exist infinitely many isomorphism classes of indecomposable totally reflexive R-modules of multiplicity n.

Tài liệu tham khảo

Araya, T., Iima, K.-i., Takahashi, R.: On the structure of Cohen–Macaulay modules over hypersurfaces of countable Cohen–Macaulay representation type. J. Algebra 361, 213–224 (2012) Auslander, M.: Anneaux de Gorenstein, et torsion en algèbre commutative, Séminaire d’Algèbre Commutative dirigé par Pierre Samuel, 1966/67, Texte rédigé, d’après des exposés de Maurice Auslander, Marquerite Mangeney, Christian Peskine et Lucien Szpiro, École Normale Supérieure de Jeunes Filles, Secrétariat mathématique, Paris (1967) Auslander, M., Bridger, M.: Stable module theory. Mem. Am. Math. Soc., vol. 94, 146 pp. (1969) Avramov, L.L., Henriques, I.B., Şega, L.M.: Quasi-complete intersection homomorphisms. arXiv:1010.2143. Accessed 17 May 2013 Avramov, L.L., Martsinkovsky, A.: Absolute, relative, and Tate cohomology of modules of finite Gorenstein dimension. Proc. Lond. Math. Soc. 85, 393–440 (2002) Bautista, R.: On algebras of strongly unbounded representation type. Comment. Math. Helv. 60(3), 392–399 (1985) Bongartz, K.: Indecomposables are standard. Comment. Math. Helv. 60(3), 400–410 (1985) Brauer, R.: On the indecomposable representations of algebras. Bull. Am. Math. Soc. 47, 684 (1941) Bruns, W., Herzog, J.: Cohen–Macaulay Rings, revised edn. Cambridge Studies in Advanced Mathematics, vol. 39. Cambridge University Press, Cambridge (1998) Christensen, L.W.: Gorenstein dimensions. In: Lecture Notes in Mathematics, vol. 1747. Springer, Berlin (2000) Christensen, L.W., Foxby, H.-B., Holm, H.: Beyond totally reflexive modules and back: a survey on Gorenstein dimensions. Commutative algebra—Noetherian and non-Noetherian perspectives, pp. 101–143. Springer, New York (2011) Christensen, L.W., Jorgensen, D.A., Rahmati, H., Striuli, J., Wiegand, R.: Brauer–Thrall for totally reflexive modules. J. Algebra 350, 340–373 (2012) Christensen, L.W., Piepmeyer, G., Striuli, J., Takahashi, R.: Finite Gorenstein representation type implies simple singularity. Adv. Math. 218(4), 1012–1026 (2008) Henriques, I.B., Şega, L.M.: Free resolutions over short Gorenstein local rings. Math. Z. 267(3–4), 645–663 (2011) Holm, H.: Construction of totally reflexive modules from an exact pair of zero divisors. Bull. Lond. Math. Soc. 43(2), 278–288 (2011) Jans, J.P.: On the indecomposable representations of algebras. Ann. Math. 66(2), 418–429 (1957) Roĭter, A.V.: Unboundedness of the dimensions of the indecomposable representations of an algebra which has infinitely many indecomposable representations (Russian). Izv. Akad. Nauk SSSR Ser. Mat. 32, 1275–1282 (1968) Soto, J.J.M.: Gorenstein quotients by principal ideals of free Koszul homology. Glasg. Math. J. 42(1), 51–54 (2000) Takahashi, R.: Some characterizations of Gorenstein local rings in terms of G-dimension. Acta Math. Hungar. 104(4), 315–322 (2004) Takahashi, R.: On G-regular local rings. Comm. Algebra 36(12), 4472–4491 (2008) Thrall, R.M.: On ahdir algebras. Bull. Am. Math. Soc. 53, 49 (1947) Yoshino, Y.: Cohen–Macaulay modules over Cohen–Macaulay rings. In: London Mathematical Society Lecture Note Series, vol. 146. Cambridge University Press, Cambridge (1990) Yoshino, Y.: Modules of G-dimension zero over local rings with the cube of maximal ideal being zero. Commutative algebra, singularities and computer algebra (Sinaia, 2002), pp. 255–273. NATO Sci. Ser. II Math. Phys. Chem. pp. 115. Kluwer Acad. Publ., Dordrecht (2003)